Affiliation:
1. Kh.I. Ibragimov Complex Research Institute of the Russian Academy of Sciences
2. Don State Technical University
3. Volgograd State Technical University
4. V.G. Shukhova Belgorod State Technological University
Abstract
Objective. When constructing the resolving relations of the theory of shells, the validity of the basic assumptions about the material of the structure under consideration is assumed, which is considered homogeneous, isotropic and viscoelastic, i.e. obeying the Maxwell-Gurevich law. The subject to study is a polymer cylindrical shell, rigidly clamped at the base and subject to internal hydrostatic pressure. Method. The problem is reduced to an inhomogeneous differential equation of the fourth degree with respect to the displacement of the middle surface w along the z axis. Since the closed form representation of the solution to this equation is extremely difficult, the search for it is presented numerically, in particular, using the grid method. The creep strain components ε*x, ε*θ, γ*xθ were determined as a linear approximation of the velocity by the Runge-Kutta method. Result. In the process of calculating the shell using moment theory, it was found that as a result of shell creep, tangential stresses increased by more than 12 percent. Conclusion. The proposed technique makes it possible to simulate changes in the mechanical properties of the shell (for example, indirect heterogeneity) caused by the influence of physical fields.
Publisher
FSB Educational Establishment of Higher Education Daghestan State Technical University
Reference12 articles.
1. Rabinovich, A.L. Introduction to the mechanics of reinforced polymers [Text] M.: Nauka, 1970; 483 (In Russ).
2. Petrov V.V. Calculation of shells of non-uniform thickness taking into account physical and geometric nonlinearities. Academia. Architecture and construction. 2016; 1: 112-117. (In Russ).
3. Yazyev B. M., Chepurnenko A. S., Saibel A. V. Modeling of stress-strain state of thick concrete slabs taking the creep of concrete into account. International Journal for Computational Civil and Structural Engineering. 2017; 13(4): 140-148.
4. Dudnik A.E., Chepurnenko A.S., Nikora N.I., Denego A.S. Flat deformed state of a polymer cylinder under thermoviscoelastic conditions. Engineering Bulletin of the Don, 2015;2 URL: vdon.ru/ru/magazine/archive/n2p2y2015/3063. (In Russ).
5. Andreev V.I., Yazyev B.M., Chepurnenko A.S. On the bending of a thin polymer plate at nonlinear creep. Advanced Materials Research. 2014; 900: 707-710.